The structure of the observable algebra determined by a hopf ∗-subalgebra in hopf spin models

Xiaomin Wei; Lining Jiang; Qiaoling Xin

doi:10.2298/FIL2102485W

The structure of the observable algebra determined by a hopf ∗-subalgebra in hopf spin models

Xiaomin Wei, Lining Jiang^*, Qiaoling Xin

^*Corresponding author for this work

School of Mathematics and Statistics

Research output: Contribution to journal › Article › peer-review

2 Citations (Scopus)

Abstract

Let H be a finite dimensional Hopf C^∗-algebra, H₁ a Hopf ∗-subalgebra of H. This paper focuses on the observable algebra A_H1 determined by H₁ in nonequilibrium Hopf spin models, in which there is a copy of H₁ on each lattice site, and a copy of Ĥ on each link, where Ĥ denotes the dual of H. Furthermore, using the iterated twisted tensor product of finite ∗-algebras, one can prove that the observable algebra A_H1 is ∗-isomorphic to the C^∗-inductive limit · · · ⋊ H₁ ⋊ Ĥ ⋊ H₁ ⋊ Ĥ ⋊ H₁ ⋊ · · · .

Original language	English
Pages (from-to)	485-500
Number of pages	16
Journal	Filomat
Volume	35
Issue number	2
DOIs	https://doi.org/10.2298/FIL2102485W
Publication status	Published - 2021

Keywords

C-inductive limit
The observable algebra
Twisted tensor product

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10.2298/FIL2102485W

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title = "The structure of the observable algebra determined by a hopf ∗-subalgebra in hopf spin models",

abstract = "Let H be a finite dimensional Hopf C∗-algebra, H1 a Hopf ∗-subalgebra of H. This paper focuses on the observable algebra AH1 determined by H1 in nonequilibrium Hopf spin models, in which there is a copy of H1 on each lattice site, and a copy of Ĥ on each link, where Ĥ denotes the dual of H. Furthermore, using the iterated twisted tensor product of finite ∗-algebras, one can prove that the observable algebra AH1 is ∗-isomorphic to the C∗-inductive limit · · · ⋊ H1 ⋊ Ĥ ⋊ H1 ⋊ Ĥ ⋊ H1 ⋊ · · · .",

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author = "Xiaomin Wei and Lining Jiang and Qiaoling Xin",

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T1 - The structure of the observable algebra determined by a hopf ∗-subalgebra in hopf spin models

AU - Wei, Xiaomin

AU - Jiang, Lining

AU - Xin, Qiaoling

PY - 2021

Y1 - 2021

N2 - Let H be a finite dimensional Hopf C∗-algebra, H1 a Hopf ∗-subalgebra of H. This paper focuses on the observable algebra AH1 determined by H1 in nonequilibrium Hopf spin models, in which there is a copy of H1 on each lattice site, and a copy of Ĥ on each link, where Ĥ denotes the dual of H. Furthermore, using the iterated twisted tensor product of finite ∗-algebras, one can prove that the observable algebra AH1 is ∗-isomorphic to the C∗-inductive limit · · · ⋊ H1 ⋊ Ĥ ⋊ H1 ⋊ Ĥ ⋊ H1 ⋊ · · · .

AB - Let H be a finite dimensional Hopf C∗-algebra, H1 a Hopf ∗-subalgebra of H. This paper focuses on the observable algebra AH1 determined by H1 in nonequilibrium Hopf spin models, in which there is a copy of H1 on each lattice site, and a copy of Ĥ on each link, where Ĥ denotes the dual of H. Furthermore, using the iterated twisted tensor product of finite ∗-algebras, one can prove that the observable algebra AH1 is ∗-isomorphic to the C∗-inductive limit · · · ⋊ H1 ⋊ Ĥ ⋊ H1 ⋊ Ĥ ⋊ H1 ⋊ · · · .

KW - C-inductive limit

KW - The observable algebra

KW - Twisted tensor product

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EP - 500

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JF - Filomat

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ER -

The structure of the observable algebra determined by a hopf ∗-subalgebra in hopf spin models

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